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Every Borel function is monotone Borel
Annals of Pure and Applied Logic 54 (1):87-99 (1991)
Abstract
Given two internal sets X and Y we prove that every Borel function whose graph is a subset of the product X x Y is a member of the least set containing the class of all internal functions and closed with respect to the operations of monotone countable union and intersection. We also prove that any Souslin function can be extended to a Borel function and obtain, as a corollary, a new proof of the recent result of Henson and Ross about the measure preserving property of injective Souslin functions. Further we give a new proof of the fact that injective Borel functions map Borel sets into Borel. A structural result for Souslin graphs all of whose Y-sections are of cardinality n is givenOther Versions
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Citations of this work
Louveau's theorem for the descriptive set theory of internal sets.Kenneth Schilling & Bosko Zivaljevic - 1997 - Journal of Symbolic Logic 62 (2):595-607.
References found in this work
Descriptive set theory over hyperfinite sets.H. Jerome Keisler, Kenneth Kunen, Arnold Miller & Steven Leth - 1989 - Journal of Symbolic Logic 54 (4):1167-1180.
Some results about borel sets in descriptive set theory of hyperfinite sets.Boško Živaljević - 1990 - Journal of Symbolic Logic 55 (2):604-614.
The structure of graphs all of whose y-sections are internal sets.Boško Živaljević - 1991 - Journal of Symbolic Logic 56 (1):50-66.
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